Connectivity of soft random geometric graphs

Abstract

Consider a graph on n uniform random points in the unit square, each pair being connected by an edge with probability p if the inter-point distance is at most r. We show that as n∞ the probability of full connectivity is governed by that of having no isolated vertices, itself governed by a Poisson approximation for the number of isolated vertices, uniformly over all choices of p,r. We determine the asymptotic probability of connectivity for all (pn,rn) subject to rn=O(n-), some >0. We generalize the first result to higher dimensions and to a larger class of connection probability functions.